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introducing introducing
a fully integrated mathematics
learning platform
a fully integrated mathematics
learning platform
AlgebraAlgebra Graphs
& Geometry
Graphs
& Geometry
Lists &
Spreadsheet
Lists &
Spreadsheet
bringing it all
together
bringing it all
together
algebra
statistics
geometryCalculator
Lists &Spreadsheet
Graphs &Geometry
Notes
Assessment
& Review
Assessment
& Review
assessment & review
Introducing TI-Nspire CAS
fully integrated technology
• Multiple representations, dynamically linked, encouraging multiple approaches to solving problems and expressing solutions.
• A complete set of easy-to-use mathematical tools for algebra, number, geometry, statistics and real-world data collection - all in one package.
• Working documents can be saved, recalled, edited and transferred between handheld, PC and Mac - and distributed electronically!
•An optimal tool for concept and skill development across the secondary school years.
what is TI-Nspire CAS?
Just imagine…
The algebraic powerof the TI-89T…
The statistical and graphical power of the TI-84Plus…
The interactivegeometryof the Voyage 200…
Now integrate these with spreadsheeting,real-world data collection and more…
TI-Nspire CAS integrates list and spreadsheet capabilities, supporting…
what is TI-Nspire CAS?
real-world data collection
and a complete range of easy-to-use menu-driven statistical functions.
how is TI-Nspire CAS different to the TI-89T?
Consider this problem:
At exactly what value of x do the curves y = ax and y = loga(x) kiss?
Using the TI-89T…
1. INVESTIGATE GRAPHICALLYBy trial and error, define various values for “a” and observe the effect on the graph.
2. BUILD AN ALGEBRAIC SOLUTIONCarefully solve the problem algebraically – ensuring that all expressions are entered correctly!
TI-Nspire CAS: different to the TI-89T? How?
Consider this problem:
At exactly what value of x do the curves y = ax and y = loga(x) kiss?
Using TI-Nspire CAS…
1. Easily create a slider and explore many possible values for “a”. Label algebraic objects correctly using templates.
2. Use templates to easily and correctly enter all expressions: input and output both expressed in mathematical notation!
3. Students use Notes to explain their thinking and describe the solution process.
an optimal modeling environment
Problem posing and solving
Model geometrically
Explore Graphically
Explore Algebraically
Fully integrated Mathematics learning environment
examination ready…
VCE 2005Mathematical MethodsExamination 1Part 2Question 4
benefits for all…
• An optimal environment for teachers
• An optimal environment for students